Cyclic cohomology of certain nuclear Fr\'echet and DF algebras

Abstract

We give explicit formulae for the continuous Hochschild and cyclic homology and cohomology of certain topological algebras. To this end we show that, for a continuous morphism φ: of complexes of complete nuclear DF-spaces, the isomorphism of cohomology groups Hn(φ): Hn() Hn() is automatically topological. The continuous cyclic-type homology and cohomology are described up to topological isomorphism for the following classes of biprojective -algebras: the tensor algebra E F generated by the duality (E, F, < ·, · >) for nuclear Fr\'echet spaces E and F or for nuclear DF-spaces E and F; nuclear biprojective K\"othe algebras λ(P) which are Fr\'echet spaces or DF-spaces; the algebra of distributions E*(G) on a compact Lie group G.